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The end-parameters of a Leonard pair

Published 10 Aug 2014 in math.RA | (1408.2180v2)

Abstract: Fix an algebraically closed field $\F$ and an integer $d \geq 3$. Let $V$ be a vector space over $\F$ with dimension $d+1$. A Leonard pair on $V$ is a pair of diagonalizable linear transformations $A: V \to V$ and $A* : V \to V$, each acting in an irreducible tridiagonal fashion on an eigenbasis for the other one. There is an object related to a Leonard pair called a Leonard system. It is known that a Leonard system is determined up to isomorphism by a sequence of scalars $({\th_i}{i=0}d, {\th*_i}{i=0}d, {\vphi_i}{i=1}d, {\phi_i}{i=1}d)$, called its parameter array. The scalars ${\th_i}{i=0}d$ (resp.\ ${\th*_i}{i=0}d$) are mutually distinct, and the expressions $(\th_{i-2} - \th_{i+1})/(\th_{i-1}-\th_{i})$, $(\th*_{i-2} - \th_{i+1})/(\th^{i-1}-\th*{i})$ are equal and independent of $i$ for $2 \leq i \leq d-1$. Write this common value as $\beta+1$. In the present paper, we consider the "end-parameters" $\th_0$, $\th_d$, $\th*_0$, $\th*_d$, $\vphi_1$, $\vphi_d$, $\phi_1$, $\phi_d$ of the parameter array. We show that a Leonard system is determined up to isomorphism by the end-parameters and $\beta$. We display a relation between the end-parameters and $\beta$. Using this relation, we show that there are up to inverse at most $\lfloor (d-1)/2 \rfloor$ Leonard systems that have specified end-parameters. The upper bound $\lfloor (d-1)/2 \rfloor$ is best possible.

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